2.1 was done on a lab sheet, and not on a computer, not only that it had a very specific area for lines, so I can't really do it on a computer, but all I can really do is the Follow Up.
2.1 follow up
1) In mathematics, we say that figures like Mug and Zug (but not Mug and Lug) are SIMILAR. What do you think it means for two figures to be mathematically similar.The figures of Mug and Zug are mathematically similar if they have the same shape and angles, but have different side lengths.
2) The members of the Wump family are all similar. How do the corresponding sides compare? How do the corresponding angles compare?The corresponding angles compare because they (Mug, Zug and Bug) have the same angle number on the corresponding angles. The corresponding sides can be compared because if on one figure the side is diagonal then on the other figures corresponding angles will be diagonal.
10-31 Happy Halloween!!! :)
2.1
Drawing Wumps
2.1 was done on a lab sheet, and not on a computer, not only that it had a very specific area for lines, so I can't really do it on a computer, but all I can really do is the Follow Up.
2.1 follow up
1) In mathematics, we say that figures like Mug and Zug (but not Mug and Lug) are SIMILAR. What do you think it means for two figures to be mathematically similar. The figures of Mug and Zug are mathematically similar if they have the same shape and angles, but have different side lengths.
2) The members of the Wump family are all similar. How do the corresponding sides compare? How do the corresponding angles compare?The corresponding angles compare because they (Mug, Zug and Bug) have the same angle number on the corresponding angles. The corresponding sides can be compared because if on one figure the side is diagonal then on the other figures corresponding angles will be diagonal.